Many marketing models use variants of the relationship: market share equals marketing effort divided by total marketing effort. Usually, share is defined within a customer group presumed to be reasonably homogeneous and overall share is obtained by weighting for the number in the group. Although the basic relationship can be assumed directly, certain insight is gained by deriving it from more fundamental assumptions as follows: For the given customer group, each competitive seller has a real-valued "attraction" with the following properties: (1) attraction is non-negative; (2) the attraction of a set of sellers is the sum of the attractions of the individual sellers; and (3) if the attractions of two sets of sellers are equal, the sellers have equal market shares in the customer groups. It is shown that, if the relation between share and attraction satisfies the above assumptions, is a continuous function, and is required to hold for arbitrary values of attraction and sets of sellers, then the relation is: Share equals attraction divided by total attraction. Insofar as various factors can be assembled into an attraction function that satisfies the assumptions of the theorem, the method for calculating share follows directly

Bell, David E.

Little, John D. C.

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7 Tur 1-n g : : peS :: i ; g S 0 -: 0 : f : n : V aK K; f ffEAL ::SS:00 :  ; 00 : :: S 0:,f i :;f· iI~:-; · i; _:: :i~::::::c(:apia:~!: ,,~_~~I~~( i;~-~-~j~:,_l~l1-:EE- ; I(Jr.,··:· rir ir·i· --· :: 1.I.i-.i-·-:· ·-·:i.?;·:·- · ·- · -:: ·:·- ;·:.1-;: t --i?:-· Ii ····;;·' ···IIr·: --·._:'-I:"·" . -:-·· ·ASSUMPTIONS FOR A MARKET SHARE THEOREMbyJohn D.C. Little and David E. BellOR 017-73May 1973OPERATIONS RESEARCH CENTERMassachusetts Institute of TechnologyCambridge, Massachusetts 021392ABSTRACTMany marketing models use variants of the relationship: market shareequals marketing effort divided by total marketing effort. Usually,share is defined within a customer group presumed to be reasonablyhomogeneous and overall share is obtained by weighting for the number inthe group. Although the basic relationship can be assumed directly,certain insight is gained by deriving it from more fundamental assump-tions as follows: For the given customer group, each competitive sellerhas a real-valued "attraction" with the following properties:(1) attraction is non-negative; (2) the attraction of a set of sellersis the sum of the attractions of the individual sellers; and (3) if theattractions of two sets of sellers are equal, the sellers have equalmarket shares in the customer groups.It is shown that, if the relation between share and attraction satisfiesthe above assumptions, is a continuous function, and is required to holdfor arbitrary values of attraction and sets of sellers, then the relationis: Share equals attraction divided by total attraction. Insofar asvarious factors can be assembled into an attraction function that satis-fies the assumptions of the theorem, the method for calculating sharefollows directly.31: INTRODUCTIONMarketing model builders frequently use relationships of the form (us)/(usand them) to express the effects of "us variables on purchase probabilityand market share. For example, Hlavac and Little [1] hypothesize that theprobability a car buyer will purchase his car at a given dealer is theratio of the dealer's attractiveness (which depends on various dealercharacteristics) to the sum of the same quantities over all dealers. Urban[2], in his new product model SPRINTER, makes the sales rate of a brand in astore depend on the ratio of a function of certain brand variables to thesum of such functions across brands. Kuehn and Weiss [3] make use of (us)/(us and them) formulations in a marketing game model, as does Kotler [4]in a market simulation. Mills [5] and Friedman [6] employ models of thisform in game-theoretic analyses of competition. Urban [7] and Lambin [8]fit similar models to empirical data, Urban to a product sold in supermarketsand Lambin to a gasoline market.In all these cases a competitive effect is introduced by a simple normal-ization. That is, a quantity is defined that relates only to the marketingactions and uncontrolled variables of a specific selling entity. Then, byadding over sellers and using the sum as a denominator, a market share isobtained for each seller. (Time lags, market segmentation or otherphenomena may also be introduced to complicate matters, but we focus here onthe basic formulation.) The result is a competitive model, since anyseller's market share depends on the actions of every other seller.Normalized attraction models of this type can be postulated directly, but itis of interest to examine-them more closely and ask what more basicassumptions can be used to derive them. The purpose of this paper is to4examine the mathematics of the situation and argue that under certainconditions such a normalization is required.2: FORMAL DEVELOPMENTConsider a finite set,.4, of sellers which includes all sellers fromwhom a given customer group makes its purchases. Suppose that thecustomer group's inclination toward each seller can be expressed as areal-valued "attraction". Let= {s1, ..., sn} = the set of sellersa(S) = the attraction of a subset S of sellersnA = a(si) = sum of attractions of all individual sellersi=lm(si) = market share of seller si in the customer groupWe assumeAl: Attraction is non-negativea(si) > 0 Si A2: The attraction of a set, S, of sellers is finite and isthe sum of the attractions of the individual sellersa(S) = E a(si) S csiesA3: If two sellers have equal attractions, their marketshares are equala(s i ) = a(sj) => m(si) = m (sj)5A4: Market share, as a function of attraction, is continuous.Our goal is to find a functional relation between share and attractionthat satisfies these assumptions. In doing so, we shall require therelationship to be general in the sense that, if the value of an attractionis increased or a seller added or other arbitrary change made in thesystem, the same function will hold.Theorem If a market share is assigned to each seller in such a waythat assumptions Al - A4 are satisfied and such that the function relatingattraction to share holds for arbitrary values of attraction and sets ofsellers, then market share is given bynm(s i ) = a(si) / E a(sj)j=1Proof Consider a particular case with a set of sellers,f,andattraction values a(s)}. Any market share function for the situation,m :+ [0, 1] must satisfyn(i) E m(s.) = 1i=l(ii) a(si) = a(sj) => m(si) = m(sj)Consider a candidate class of functions, F, for mapping attraction intoshare. For f F, f : [O,) - [0,1]. First we observe that6nf[a(sj)] =1 (2.1)i=lsince market shares must add to 1.Further by A2 and A3f[a(S)] = f[ a(si)]sieSand in particular, for S =,f[a( )] : f[A] = 1 (2.2)Suppose that a(sk) = OLet S = {si i =k} Thena(S) = I a(s.) = Asicsso that f[a(S)] = 1. However, since shares must add to 1,f[a(S)] + f[a(sk)] = 1and so f[O] O0 (2.3)A 1 - 1 correspondence can be set up between f - functions and m -functions in the sense than an m - function can be defined from anyf - function and vice-versa as follows:Given m definefix] = m(si) if x = a(si)= x/A otherwise7Given f, definem(si) = f[a(si)]Notice that except for 0 and A, we have not yet defined f on any of thepoints of interest, i.e., on a(si). We are requiring that f satisfyAl - A3 for arbitrary {a(si)}. Consider the following sequence of cases:1A A( 2' /2' ° . . .( /3 A/3' /3, O,A A . . .n nIn the kth case A3 and (2.1) requirek f[A/k + (n - k) f [0] = 1or f[A/k] = /kNow consider the case(rA/k, A/k, . . . . A/k, 0 .. . ,0). . , 0)A/dk = 1 2 . . . n. 0o)thenf[rA/k] + (k - r) f (A/k) +or frrA/kl = r/k(n - k + r - 1) f [0] = 1V O< r < k < nr< k8Since this is to hold for any finite n and f is continuous by A4, r/can be replaced by y [0, 1] or, letting x = ykf[x] = X/A x [0, A]In particularnm(si) = f[a(si)] = a(si)/ I a(si)i=las was to be shown.3. DISCUSSIONThe key point of the mathematical analysis is that, if a quantity(e.g., "attraction") is declared to be additive and to be related toanother which is constrained in its sum (e.g., share = 1), thenmathematical consistency pushes the functional relation into the normalizedform. In the present case A2 establishes the additivity, A3 establishesa connection between the two quantities, and the constraint arises fromthe definition of market share. The role of A4 is to avoid themathematical embarrassment of having the function defined only on therational numbers or of devising some other circumlocution.The important point for the model builder is that the simplest type ofmodel, namely, one which focuses on the efforts of a single seller andassumes additivity, is converted immediately into a fully competitivemodel, by the simple device of normalization. In practice, one must_ ~ ~__I_ · I-9be cautious about assuming additivity but usually it is valid over arange and is the first step on the road to more complicated structures.It is instructive to point out an appealing method that cannot be usedto deduce the normalization model. At first glance it appears that,since market share is, by definition, the ratio of sales to total sales,it would be sufficient to assume that sales are proportional to theseller's attraction function. Calculation of share immediately givesthe normalization model.However, this will only be valid in a totally non-competitive marketwhere the marketing activities of one seller do not influence the salesof another. If, for example, the market is of fixed size in total sales,individual sales cannot be linear with the attraction function. Further-more, sales cannot be independent of competitive attraction.It should be pointed out that we have not deduced any specific resultsabout market behavior, but rather some mathematical rules of the game.Thus, if someone asserts that attraction = x2 where x is advertising,and the right relationship is really x3, the calculation of marketshares will be wrong.4. APPLICATION TO PROBABILITY OF PURCHASEThe statement of the assumptions and results was in terms of marketshare but the term "probability of purchase" could clearly be substitutedwithout affecting the mathematical development. Notice that the resultsrefer to probability of purchase from a seller given that a purchase10will be made. In other words, the sum of the purchase probabilitiesis presumed to be 1. Obviously, the probability of no purchase can beintroduced as an extension of the model, as can be multiple purchases,and so on. We here concentrate on this single aspect.5. RELATIONSHIP TO PROBABILITY THEORYAssumptions Al and A2 are two of the three axioms of finite sample spaceprobability theory. (See, for example, Parzen [9].) The third axiom isthat the probability of a certain event is 1. Thus Al and A2 areassumptions that make a(.) an unnormalized probability function on aset of sellers.The choice of these assumptions is, of course, deliberate and bringsout the close mathematical connection between the attraction theorybeing presented and probability. Market share, on the other hand,satisfies all the axioms and so, mathematically speaking, is a probabilityfunction defined on the set of sellers. The role of A3 is to connectattraction and share,which it does by forcing a normalization that mapsthe attraction function into an ordinary probability function.The fact that market share has the mathematical properties of aprobability can be helpful in other ways. For example, if severalcustomer groups or market segments are identified, the concept ofconditional market share becomes useful.__·_ ___·II__CIIIII___*PY_.-^1II··IIIIU·11LetC = {cl, . . . , cr. = a set of r customer groupsa(silc j) = attraction of seller groups si given customer group jnA(cj) = E a(sj lcj)i=lp(cj) = proportion of total sales coming from customer group cjThen assuming that Al - A4 hold for each customer group,nm(slci ) = a(silcj)/ E a(slicj)i=land, in any case,rm(si) m(silc j) p (cj) j=lBy partitioning the population into groups or segments a complex modelcan be built up from simple elements. Different marketing variables,say, price, promotion, advertising, and distribution, may impingedifferently on different segments, which may, in turn, respond differently.The responses would define relative attraction function which would thenbe assembled as shown above. L  _II__12REFERENCES1: T.E. Hlavac, Jr., and J.D.C. Little, "A Geographic Model of anUrban Automobile Market," Proceedings of the Fourth InternationalConference on Operational Research, D.B. Hertz and J. Melese,eds., Wiley-Interscience, New York, 1969, pp 302-311.2: G.L. Urban,"SPRINTER Mod III: A model for the Analysis of NewFrequently Purchased Consumer Products," Operations Research,18, 805-854, (September 1970)3: A.A. Kuehn and D.L. Weiss, "Marketing Analysis Training Exercise,"Behavioral Science, 10, 51-67 (January 19654: P. Kotler, "Competitive Strategies for New Product Marketing Overthe Life Cycle," Management Science, 12, B104-19 (December 1965)5: H.D. Mills, "A Study in Promotional Competition," MathematicalModels and Methods in Marketing, F. Bass et al., eds.,Richard D. Irwin, Homewood Illinois, 1961, pp271-88.6: L. Friedman, "Game Theory in the Allocation of AdvertisingExpenditures," Operations Research, 6, 699-709 (September 1958)7: G.L. Urban, "An On-Line Technique for Estimating and AnalyzingComplex Models," Changing Marketing Systems, R. Moyer, ed.,American Marketing Association, 1968, pp322-27.8: J.J. Lambin, "A Computer On-Line Marketing Mix Model," Journal ofMarketing Research, 9, 119-26 (May 1972)9: E. Parzen, Modern Probability Theory and Its Applications, Wiley,New York, 1960, p.18._- 

Assumptions for a Market Share Theorem

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Assumptions for a Market Share Theorem

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